Pages that link to "Item:Q2492643"

The following pages link to The maximal number of geometric permutations for \(n\) disjoint translates of a convex set in \(\mathbb R\) is \(\Omega(n)\) (Q2492643):

Displaying 13 items.

• Geometric orderings of intersecting translates and their applications (Q676584) (← links)
• Upper bounds on geometric permutations for convex sets (Q748890) (← links)
• Geometric permutations and common transversals (Q1084672) (← links)
• The different ways of stabbing disjoint convex sets (Q1184163) (← links)
• Bounding the number of geometric permutations induced by \(k\)-transversals (Q1924220) (← links)
• On the number of directions determined by the common tangents to a family of pairwise disjoint convex sets in the plane (Q2340406) (← links)
• Forbidden families of geometric permutations in \(\mathbb R^{d}\) (Q2486854) (← links)
• Geometric permutations induced by line transversals through a fixed point (Q2571327) (← links)
• Inflating balls is NP-hard (Q2893458) (← links)
• Improved bounds for geometric permutations (Q2903522) (← links)
• On geometric permutations induced by lines transversal through a fixed point (Q2921677) (← links)
• Some Discrete Properties of the Space of Line Transversals to Disjoint Balls (Q5188768) (← links)
• A tight bound on the number of geometric permutations of convex fat objects in \(\mathbb{R}^d\) (Q5955145) (← links)